The equation of stationary wave along a stretched string is given by `y=5 sin ((pix)/(3)) cos 40 pi t `, where x and y are in cm and t in second. The separation between two adjacent nodes is

The equation of stationary wave along a stretched string is given by y = 5 sin(pi x)/(3) cos 40pi t where x and y are in centimetre and t in second. The separation between two adjacent nodes is :

The equation of a stationary wave along a stretched string is given by y = 4 sin frac{2pi"x"}{3} cos 4Opit where, x and y are in cms and t is in sec. The separation between two adjacent nodes is

The equation of standing wave in a stretched string is given by {y =2sin [pi /2 (x)] cos(20 pi t)} where x and y are in meter and t is in second. Then minimum separation between two particle which are at the antinodes and having same phase will be

A string vibrates according to the equation y=5 sin ((2 pi x)/(3)) cos 20 pi t , where x and y are in cm and t in sec . The distance between two adjacent nodes is

A standing wave is given by y=5"sin" (pi x)/(20) cos 40 pit , where x and y are in cm and t is in second. What is the minimum distance between a node and the adjacent antinode ?

The equation of a wave travelling on a stretched string is y = 4 sin 2 pi ((t)/(0.02)-(x)/(100)) Here, x and y are in cm and t is in second. The speed of wave is

The equation of a stationary wave is given by y=6sin(pi)//(x)cos40pit Where y and x are given in cm and time t in second. Then the amplitude of progressive wave is